Barbell lifting for wavelet coding

ABSTRACT

A method for encoding motion-compensated video data includes generating, for a current frame, a high-pass wavelet coefficient based on a function of pixels in a temporally adjacent frame. The operations are repeated for multiple pixels in an array of pixels in the current frame to form an array of high-pass wavelet coefficients. A low-pass wavelet coefficient is generated based on a function of the high-pass wavelet coefficients. A system for coding video data includes a temporal wavelet decomposition module decomposing a pixel into a high-pass coefficient by performing a discrete wavelet transform on the pixel, a function of pixels in a previous frame, and/or a function of pixels in a subsequent frame. The system includes a motion estimation module generating motion vectors associated with the pixels in the previous frame and in the subsequent frame.

RELATED APPLICATIONS

This application is a divisional of and claims priority from U.S. patent application Ser. No. 10/911,836, titled “Barbell Lifting For Wavelet Coding”, filed on Aug. 4, 2004, which claims priority to U.S. Provisional Application No. 60/548,768, filed Feb. 27, 2004 and is hereby incorporated by reference.

TECHNICAL FIELD

The described subject matter relates to video encoding, and more particularly to Barbell lifting for wavelet coding.

BACKGROUND

In the field of video coding, video images or frames can be coded into wavelet coefficients. Such wavelet encoding can offer good coding efficiency. Traditional approaches to wavelet coding involve applying a 1-dimensional (1-D) wavelet transformation to a video image to decompose the image data into the coefficients that represent the video image. The decomposing process is often referred to as lifting. The wavelet coefficients can be used by a video receiver to easily reconstruct the video image. Unfortunately, traditional approaches to wavelet coding have drawbacks, particularly with respect to motion video coding.

Some video coding standards, such as MPEG-4, employ motion compensation. Generally, motion compensation involves creating motion vectors that indicate how areas (called macroblocks) of frames in motion video move from one frame to another frame. By using motion vectors, redundancy between frames can be exploited to increase video compression. Using motion vector information, the video receiver can determine where pixels move from one frame to the next.

One problem that can arise when applying wavelet coding to motion compensated video is called over-complete wavelet compensation. Over-complete wavelet compensation occurs when motion vectors collide due to contractive motion. When motion vectors collide, multiple pixels in one frame may be mapped to one pixel in a subsequent frame. FIG. 1 is a graphical illustration 100 depicting over-complete wavelet compensation. 1-dimensional pixel arrays 102 are shown in a sequence of temporally-related frames 104. As shown, three motion vectors 106 a, 106 b, and 106 c converge on a single pixel 108 in frame F₂. One possible solution to colliding motion vectors is to remove all but one of the colliding vectors. In FIG. 1, removal of motion vectors 106 a and 106 c is illustrated with an ‘X’ 110 over motion vector 106 a and an ‘X’ 112 over motion vector 106 c. However, this solution results in significant reduction of coding efficiency due to the wavelet boundary effect.

Another problem that can occur when wavelet coding motion video relates to fractional pixel (or sub-pixel) precision. Traditionally, when a motion vector indicates that a pixel of one frame has moved between two pixel positions of a subsequent frame, the pixel position is set to one or the other of the two pixel positions in the subsequent frame. In other words, the fractional pixel position motion vector is forced to an integer pixel position. Inaccuracy related to fractional pixels is illustrated in FIG. 1. A motion vector 114 (shown with a dotted line) originally points between two pixel position 116 and pixel position 118. The motion vector 114 is adjusted to a new motion vector 120 that points to pixel position 116. If, in forcing a sub-pixel to an integer pixel position, over-complete wavelet compensation occurs, the sub-pixel may be forced to a different, less accurate integer pixel position. As a result, coding accuracy and efficiency may be reduced.

Accordingly, although wavelet coding of images can be beneficial to improve coding efficiency, traditional approaches to wavelet coding has certain drawbacks when applied to motion video.

SUMMARY

Implementations relate to Barbell lifting for wavelet-based video coding to address the aforementioned problems, as well as other problems. Barbell lifting involves applying a wavelet transform in a predictive stage to generate high-pass coefficients and in an update stage to generate low-pass coefficients. The wavelet transform includes functions of sets of pixels in adjacent frames to generate wavelet coefficients. The functions can be of any form, so as to improve motion alignment, multiple-to-one pixel mapping, or fractional pixel mapping. Block-size used in the wavelet transform can be adapted to regions in a frame.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 is a graphical illustration of multiple-to-one pixel mapping and fractional pixel mapping that can occur in wavelet coded motion-compensated video;

FIG. 2 illustrates an exemplary video coder employing temporal wavelet decomposition, wherein Barbell lifting is applied with motion compensation;

FIG. 3 is a graphical illustration of motion aligned wavelet coefficients in a sequence of video frames;

FIG. 4 illustrates an wavelet coding scheme with Barbell lifting wherein a wavelet coefficient is generated for a current frame based on multiple pixels from adjacent frames;

FIG. 5 illustrates an example of high-pass wavelet coefficient generation using Barbell lifting in a prediction stage;

FIG. 6 illustrates an example of low-pass wavelet coefficient generation using Barbell lifting in an update stage;

FIG. 7 illustrates an exemplary decoding process wherein frames of high-pass and low-pass wavelet coefficients are decoded to yield even frames of decoded pixels;

FIG. 8 illustrates an exemplary decoding process wherein the even frames of decoded pixels and the frames of high-pass wavelet coefficients are decoded to yield odd frames of decoded pixels;

FIG. 9 illustrates four scenarios involving motion alignment and motion prediction when motion vectors are used in conjunction with barbell functions;

FIG. 10 illustrates various exemplary blocks of pixels, each having a different block size, to which the Barbell lifting can be applied;

FIG. 11 illustrates a pixel mismatch problem that can arise with motion alignment;

FIG. 12 illustrates an exemplary wavelet lifting scheme with barbell functions, which can solve the mismatch problem of FIG. 11;

FIG. 13 is a flow chart illustrating an exemplary algorithm for coding video data using barbell lifting;

FIG. 14 is a flow chart illustrating an exemplary algorithm for decoding frames of data that has been coded using barbell lifting;

FIG. 15 illustrates a general purpose computer that can be used to implement barbell lifting to code and decode video.

DESCRIPTION

Exemplary Video Coding System

FIG. 2 illustrates an exemplary video coder 200 employing Barbell functions for coding video data using motion alignment 3-dimensional wavelet coding. The video coder 200 exploits temporal and spatial correlation among input video frames 202 using wavelet decomposition. The video coder 200 also employs motion estimation for estimating motion of pixels across the frames 202.

Initially, the video frames 202 are input into a temporal wavelet decomposition module 204 and a motion estimation module 206. The temporal wavelet decomposition module 204 decomposes pixels in the video frames 202 into wavelet coefficients that represent the video frames 202. The temporal wavelet decomposition module 204 employs a wavelet transform, which performs a wavelet lifting process. The wavelet coefficients include low-pass and high-pass coefficients, which are described in further detail below. The output of the temporal wavelet decomposition module 204 includes frames of wavelet coefficients. The frames output from the temporal wavelet decomposition module 204 alternate between a frame of low-pass coefficients and a frame of high-pass coefficients.

The motion estimation module 206 uses pixel information from the input frames 202 to perform motion alignment. In MPEG-4, for example, the frames 202 are each composed of macroblocks. A macroblock is a region in the frames 202 used for motion alignment. For example, in some standards, each macroblock consists of a 16×16 array of pixels. The motion estimation module 206 generates motion vector(s) that represent the horizontal and vertical displacement from the macroblock being encoded to the matching macroblock-sized area in a reference frame.

The motion vector(s) from the motion estimation module 206 can be used by the temporal decomposition module 204 to generate the wavelet coefficients. Because the motion alignment is performed during the temporal wavelet decomposition, the temporal wavelet decomposition module 204 can effectively form high energy compactions using the motion alignment information.

The frames output by the temporal wavelet decomposition module 204 are input into a 2-dimensional (2-D) spatial wavelet decomposition module 208. The spatial wavelet decomposition module 208 takes advantage of spatial correlation of pixels within a frame. The spatial wavelet decomposition module 208 decomposes each input frame into wavelet coefficients in both the vertical and the horizontal dimensions. The temporal wavelet decomposition module 204 and the 2-D spatial wavelet decomposition module 208 use discrete wavelet transforms (DWTs) to generate wavelet coefficients.

An entropy coder 210 provides for further compression of the video data prior to transmission. The entropy coder 210 assigns codes to symbols in the frames output by the spatial decomposition module 208 so as the match code lengths with the probabilities of the symbols. Typically, the entropy coder 210 assigns the most common symbols to the shortest codes using an algorithm. Exemplary entropy coding algorithms include Fibonacci coding, Golomb coding, Rice coding, Huffman coding, or Range coding.

A motion vector (MV) and mode coding module 212 code MV information and mode information into the signal that is transmitted. Mode information describes the predicted direction and/or macroblock partition of a current macroblock. The predicted direction is based on whether the current macroblock is predicted from a previous reference, a future reference or both. Macroblock partition indicates whether the current macroblock is further partitioned into multiple sub-blocks, wherein each sub-block has a motion vector. A video decoder (not shown) that receives the transmitted signal uses the entropy coded, wavelet decomposed frames, and the MV and mode information to reconstruct the video frames. Generally, reconstruction of the video frames includes the reverse of the processes employed by the video coder 200.

The video coder 200 may be implemented in software, firmware, and/or hardware. The video coder 200 may be constructed as part of a general purpose computer (e.g., the computing device shown in FIG. 15) or special purpose computer (e.g., an embedded system), where the video code can be incorporated into an operating system or other application programs. Various exemplary implementations of processes employed by the video coder 220 are illustrated and described in further detail below with regard to the following figures.

FIG. 3 graphically illustrates motion alignment with temporal wavelet decomposition. In an actual implementation, a decomposed frame of video is a 2-Dimensional (2-D) wavelet coefficient array. The systems and operations described herein can be applied to 2-D arrays of any size. However, for ease of illustration, each frame in a sequence of video frames is shown in FIG. 3 as a one-dimensional (1-D) wavelet coefficient array. The frames alternate between a low-pass frame and a high-pass frame. For example, frame F₀ 300 includes an array 302 of low-pass coefficients, frame F₁ 304 includes an array 306 of high-pass coefficients, and so on. l₀, l₁, . . . , l₃ in FIG. 3 denotes the low-pass coefficients after wavelet decomposition and h₀, h₁, . . . , h₃ denotes the high-pass coefficients.

The coefficients are not necessarily determined by coefficients at the same location of adjacent frames. For example, high-pass coefficient h₀ 308 in F₁ 304 is not calculated from the collocated coefficients 310 and 312 in F₀ 300 and F₂ 314, respectively. Instead, after motion alignment, coefficient h₀ 308 is decomposed as a high-pass coefficient based on coefficients 316 and 318 of F₀ 300 and F₂ 314 specified by backward motion vector (MV) 320 and forward MV 322, respectively. Other coefficients are processed in a similar fashion.

FIG. 4 graphically illustrates a wavelet coding scheme with Barbell lifting for coding video data. The coding scheme illustrated in FIG. 4 can be carried out by the temporal wavelet decomposition module 204 (FIG. 2). For an n-dimensional (i.e., multi-dimensional) signal, such as video and images, the scheme illustrated in FIG. 4 provides for efficient 1-D wavelet decomposition by taking one or more pixels from adjacent frames. Therefore, the wavelet lifting scheme is referred to herein as ‘barbell lifting’.

FIG. 4 illustrates three one-dimensional pixel arrays to which Barbell lifting can be applied: a first pixel array 400, a second pixel array 402, and a third pixel array 404. The first pixel array 400 and the third pixel array 404 are in frames of video that are temporally adjacent to a frame that includes the second pixel array 402. A wavelet coefficient 406, labeled ‘t’, is generated that corresponds to a pixel 408, labeled S₁, in the second pixel array 402.

In one implementation of Barbell lifting pixel s₁, and a barbell function of pixels from the first pixel array 400 and the second pixel array 404, are used to generate the coefficient t 406. To illustrate, a first group of pixels 410, labeled S₀, is shown with hatch lines in the first pixel array 400. A second group of pixels 412, labeled S₂, is shown with hatch lines in the second pixel array 404. In a special case, either or both of the groups 410 and 412 do not include any pixels. In other cases, groups 410 and 412 include one or more pixels.

The pixels in the first group 410 are combined to create another pixel, referred to herein as a combopixel 414, labeled ŝ₀. Similarly, the pixels in the second group 412 are combined to create another combopixel 416, labeled ŝ₂. Combopixel ŝ₀ 414 is derived according to a function of the pixels in the first group 410. As illustrated, the function used to derive combopixel ŝ₀ 414 is ƒ₀(S₀). The function used to derive combopixel ŝ₂ 416 is ƒ₂(S₂).

Functions ƒ₀(S₀) and ƒ₂(S₂) are called barbell functions. Functions ƒ₀(S₀) and ƒ₂(S₂) can be any linear or non-linear functions that operate on any pixels in the associated frames. A barbell function, such as ƒ₀(S₀), can also vary from pixel to pixel within a frame.

The wavelet coefficient 406 is computed in the barbell lifting process in accordance with a discrete wavelet transform. Accordingly, the barbell lifting process is formulated with the general function shown in equation (1): t=a×ŝ ₀ +s ₁ +b×ŝ ₂  (1) The values ‘a’ and ‘b’ are the filtering parameters of wavelet transform. The values ‘a’ and ‘b’ may or may not be equal. Typically, the barbell lifting process is applied in two stages. The first stage, called a prediction stage, generates high-pass coefficients and the second stage, called and update stage, generates low-pass coefficients.

To illustrate barbell lifting further, a specific example is described with reference to FIGS. 5-8. The example illustrates both the wavelet transform and inverse wavelet transform. In FIGS. 5-8, a pixel is denoted by letter ‘x’, a 1-D array of pixels is denoted by letter ‘X’, a low-pass coefficient is denoted by letter ‘1’, a 1-D array of low-pass coefficients is denoted by letter ‘L’, a high-pass coefficient is denoted by ‘h’, and a 1-D array of high-pass coefficients is denoted by letter ‘H’. Although the example illustrates only 1-D pixel and coefficient arrays, it is to be understood that the barbell lifting process is typically applied across an entire 2-D frame to generate a frame of coefficients.

First, as shown in FIG. 5, the prediction stage takes original input video frames to generate high-pass frames. Each of the 1-D pixel arrays, X₀, X₁, . . . , X₄, is an array from a corresponding frame in a sequence of frames. In the prediction stage, high-pass frames are generated for each pixel in every other frame. Thus, a high-pass coefficient h₀ 500 is generated that corresponds to pixel x₁ 502 in array X₁, and another high-pass coefficient h₁ 504 is generated that corresponds to pixel x₃ 506 in array X₃.

The high-pass coefficient h₀ 500 is a wavelet transform of a combopixel {circumflex over (x)}₀ 508 from the previous frame and combopixel {circumflex over (x)}₂ 510 from the subsequent frame. As shown, combopixel {circumflex over (x)}₀ 508 is computed from a barbell function, ƒ₀(X₀), which is a function of a group of pixels in the 1-D array X₀. Also as shown, combopixel {circumflex over (x)}₂ 510 is computed from a barbell function, ƒ₂(X₂), which is a function of a group of pixels in the 1-D array X₂.

A similar process is used to compute high-pass coefficient h₁ 504. High-pass coefficient h₁ 504 is a function of combopixel {circumflex over (x)}₂′ 512 from the previous adjacent frame and combopixel {circumflex over (x)}₄ 514 from the subsequent adjacent frame. As shown, combopixel {circumflex over (x)}₂′ 512 is computed from a barbell function, ƒ₂′(X₂), which is a function of a group of pixels in the 1-D array X₂. Also as shown, combopixel {circumflex over (x)}₄ 514 is computed from a barbell function, ƒ₄(X₄), which is a function of a group of pixels in the 1-D array X₃. It is important to note that the group of pixels used in barbell function ƒ₂(X₂) can be different from the group of pixels used in the barbell function ƒ₂′(X₂).

A 1-D high-pass coefficient array, H₀, is generated by creating a high-pass coefficient for each pixel in pixel array X₁. High-pass coefficient array H₀ can be represented by [h₀₀, h₀₁, . . . , h_(0n)]. Another 1-D high-pass coefficient array, H₁, is generated by creating a high-pass coefficient for each pixel in pixel array X₃. High-pass coefficient array H₁ can be represented by [h₁₀, h₁₁, . . . , h_(1n)]. The high-pass coefficients are used in the update stage to generate low-pass coefficient arrays. An exemplary update stage is described with respect to FIG. 6.

FIG. 6 illustrates 1-D pixel frames X₀, X₃, and X₄, as in FIG. 5. However, 1-D high-pass array H₀ and 1-D high-pass array H₁ are shown in place of 1-D pixel array X₁ and 1-D pixel array X₃, respectively. 1-D low-pass coefficient arrays L₀, L₁, and L₂ are generated for 1-D pixel frames X₀, X₂, and X₄, respectively.

As illustrated in FIG. 6, a low-pass coefficient, l₀, corresponding to pixel x₀ is based on the pixel x₀ and a group of high-pass coefficients from the 1-D high-pass coefficient array H₀. The group of high-pass coefficients are combined to form a value ĥ₀, referred to herein as a combo-coefficient 600. The combo-coefficient is derived from function g₀(H₀), which operates on the group of high-pass coefficients from 1-D coefficient array H₀. Low-pass coefficient, l₀, can be derived from the following wavelet transform: l ₀ =x ₀+2b×ĥ ₀  (2)

Low-pass coefficient array L₁ is derived in a similar fashion, using groups of high-pass coefficients from high-pass coefficient array H₀ and high-pass coefficient array H₁, as well as the pixels in pixel array X₂. For example, a combo-coefficient ĥ₀′ 602 is computed from barbell function g₀′(H₀), and combo-coefficient ĥ₁ 604 is computed from barbell function g₁(H₁). The low-pass coefficient l₁ can be specified by wavelet transform (3): l ₁ =b×ĥ ₀ ′+x ₂ +b×ĥ ₁  (3)

A similar process is used to generate low-pass coefficients in low-pass coefficient array L₂ using a high-pass combo-coefficient ĥ₁′ 606 and pixel x₄. As shown, combo-coefficient ĥ₁′ 606 is the result of function g₁′(H₁).

After the prediction stage creates frames of high-pass coefficients and the update stage creates frames of low-pass coefficients, the high-pass and low-pass coefficient frames are transmitted to a video receiver. The video receiver uses a decoder to decode the wavelet coefficient data. The process of decoding is typically an inverse process. FIGS. 7-8 illustrate the inverse of the barbell lifting process.

For the inverse transform, as long as the original barbell functions used at the update stage are known, the even frames can be recovered first with available high-pass and low-pass frames as shown in FIG. 7. If the barbell functions at the prediction stage are known, the odd frames can be reconstructed with the available even frames and high-pass frames as shown in FIG. 8.

Referring specifically to FIG. 7, a sequence 700 of coded 1-D coefficient arrays L₀, H₀, L₁, H₁, and L₂ are used to generate decoded video arrays. In a first step of the decoding process, 1-D pixel arrays X₀ (702), X₂ (704), and X₄ (706) corresponding to even numbered video frames are generated. Thus, as shown 1-D pixel arrays X₀ (702), X₂ (704), and X₄ correspond to low-pass coefficient arrays L₀, L₁, and L₂, respectively. The process of generating 1-D pixel arrays X₀ (702), X₂ (704), and X₄ (706) is substantially inverse of the process illustrated in FIG. 6. Generally, a pixel in one of the pixel arrays X₀ (702), X₂ (704), and X₄ (706) is generated from an inverse wavelet transform of a combination of high-pass coefficient in an adjacent array, and a low-pass coefficient in the corresponding low-pass coefficient array.

For example, as shown, pixels in the pixel array X0 (702) is a combination of a low-pass coefficient, l₀, from coefficient array L₀ and high-pass coefficients from coefficient array H₀. Generating a pixel, x₀, in 1-D array X₀ can be generalized by equation (4) below: x ₀ =l ₀+(−2b)×ĥ ₀  (4) In equation (4), the value ĥ₀ is equal to function g₀(H₀), which is a barbell function of one or more coefficients in coefficient array H₀. Pixels in pixel arrays X₂ (704) and X₄ (706) are generated in a similar manner to complete the pixel arrays. In this manner, the even video frames are generated by the decoder.

Referring to FIG. 8, there is shown a process 800 for generating the odd numbered video frames by decoding the remaining wavelet coded frames. The previously generated even numbered 1-D pixel arrays X₀, X₂, and X₄ are shown adjacent the high-pass coefficient arrays H₀ and H₁. Pixel arrays X₁ (802) and X₃ (804) correspond to odd numbered video frames and the high-pass coefficient arrays H₀ and H₁. Each pixel in the arrays X₁ (802) and X₃ (804) are generated by applying an inverse wavelet transform to a combination of pixels in adjacent decoded pixel arrays (e.g., pixel array X₀, X₂, or X₄) and a corresponding high-pass coefficient.

For example, a pixel, x₁, in array X₁ (802) is generated from a combination of pixels in array X₀, a combination of pixels in X₂, and high-pass coefficient h₀ in array H₀. A wavelet transform that describes pixel x₁ is given in equation (5) below: x ₁ =a×{circumflex over (x)} ₀ +h ₀ +a×{circumflex over (x)} ₂  (5) In equation (5), the value {circumflex over (x)}₀ is equal to function ƒ₀(X₀), which is a function of one or more pixels in array X₀. The value {circumflex over (x)}₂ is equal to function ƒ₂(X₂), which is a function of one or more pixels in array X₂. The pixel array X₃ (804) can be generated in a similar fashion. Using the decoding scheme shown in FIG. 8, the odd frames of the video can be generated. Exemplary Barbell Functions

Barbell function can be any arbitrary functions. However, some barbell functions are more efficient for temporal decomposition. When choosing a barbell function, the high-pass coefficients are preferably close to zero for efficient energy packing. The low-pass coefficients are preferably free from ghosting artifacts for temporal scalability and subsequent spatial decomposition. The barbell function preferably follows the motion trajectory for efficient decomposition and efficient coding of the barbell functions. The barbell functions are preferably consistent in the prediction and update stages. Preferably the decomposition efficiency and the side information are balanced. Lastly, a barbell function is preferably able to distribute quantization errors among many coefficients, instead of accumulating the errors to only a few coefficients. The foregoing guidelines are only suggestions and are not required in designing barbell functions.

According to the above principles, many motion prediction techniques can be used to form efficient barbell functions. FIG. 9 illustrates some example scenarios in which barbell functions can be effectively used with motion vectors in the prediction stage. An integer motion alignment scenario is shown in FIG. 9( a). An exemplary barbell function associated with the integer motion alignment scenario is given as follows: ƒ=F _(i)(x+Δx,y+Δy)  (6) In equation (6), (Δx,Δy) represents the motion vector of a current pixel (x, y). The symbol F_(i) denotes the previous frame and symbol F_(j) denotes the current frame.

A fractional-pixel motion alignment scenario is shown in FIG. 9( b). An exemplary barbell function for the fractional-pixel motion alignment scenario is shown in equation (7):

$\begin{matrix} {f = {\sum\limits_{m}{\sum\limits_{n}{{\alpha\left( {m,n} \right)}{F_{i}\left( {{x + \left\lfloor {\Delta\; x} \right\rfloor + m},{y + \left\lfloor {\Delta\; y} \right\rfloor + n}} \right)}}}}} & (7) \end{matrix}$ In equation (7), the symbol └ ┘ denotes the integer part of Δx and Δy. The barbell function specified in equation (7) yields a fractional pixel value calculated from neighboring pixels at integer pixel positions using an interpolation filter. The value α(m,n) is a factor of the interpolation filter at each pixel identified by indices m and n.

A multiple-to-one pixel mapping scenario is shown as in FIG. 9( c). An exemplary barbell function associated with the multiple-to-one pixel mapping scenario is shown in equation (8):

$\begin{matrix} {f = {\sum\limits_{m}{\sum\limits_{n}{{\alpha\left( {m,n} \right)}{F_{i}\left( {{x + \;{\Delta\; x_{m}}},{y + {\Delta\; y_{n}}}} \right)}}}}} & (8) \end{matrix}$ In equation (8), the value α(m,n) is a weighting factor for each of the multiple pixels (x_(m),y_(n)) in a previous frame F_(i) that are mapped to a single pixel (x, y) in the current frame F_(j).

The barbell lifting scheme can improve motion prediction. FIG. 9( d) shows a scenario in which a barbell function uses motion vectors associated with pixels around a pixel, (x,y), in a current frame, F_(j), to obtain multiple predictions from the previous frame, F_(i), and generate a new prediction. Not only is motion vector (Δx₀,Δy₀) used, but also motion vectors of neighboring pixels or blocks. An exemplary barbell function is shown in equation (9):

$\begin{matrix} {f = {\sum\limits_{{m = 0},{\pm 1}}{\sum\limits_{{n = 0},{\pm 1}}{{\alpha\left( {m,n} \right)}{F_{i}\left( {{x\; + {\Delta\; x_{m}}},{y + {\Delta\; y_{n}}}} \right)}}}}} & (9) \end{matrix}$ In equation (9), the values m and n take on all possible combinations of 0, 1, and −1. The value α(m,n) is a weighting factor. Although equation (9) describes a scenario involving eight neighboring pixels, the barbell function is not limited to eight neighboring pixels. Indeed, the barbell function specified in equation (9) can be extended to more general cases, such as less or more than eight neighboring pixels.

In addition, the barbell lifting scheme can be applied with adaptive block size motion alignment as shown in FIG. 10. In this implementation, the same barbell function is applied to a block of pixels, which can reduce overhead associated with the barbell functions. The block sizes can be adapted to different regions in a video frame. FIG. 10 illustrates pixels in a current frame F_(j) as they relate to pixels in a previous frame F_(i). As shown, pixels can be grouped into blocks of various sizes, such as, but not limited to, a block size of two (1000), four (1002), or eight (1004) pixels. In one implementation of a temporal wavelet coder, the barbell lifting function is applied over a large block size in the flat regions of video and applied over small block size in complex regions.

Referring again to FIG. 9, as depicted in FIGS. 9( b) and (c), when pixels in different frames are aligned with motion vectors at fractional-pixel precision or with multiple-to-one pixel mapping, the prediction and update stages may have mismatch. Preferably, the update and prediction stages use the same motion vector(s) in order to save overhead bits to code motion vectors. The motion vector of the update stage is the inverse of the motion vector at the prediction stage, i.e., the same value but reverse direction.

FIG. 11 depicts an exemplary mismatch scenario. For example, the motion vector (Δx_(m),Δy_(n)) 1100 of pixel F_(j)(x_(m),y_(n)) 1102 points to a fractional location in frame F_(i). Assuming linear interpolation is applied, it means that the prediction of pixel F_(j)(x_(m),y_(n)) 1102 is the weighted average of pixel 1104 and pixel 1106. In the update stage, the motion vector of pixel 1104 has the same value and inverse direction of (Δx_(m),Δy_(n)) as shown by the arrow with dashed line in FIG. 11. Therefore, pixel 1104 is updated with the predicted results of F_(j)(x_(m),y _(n) ) and F_(j)(x_(m+1),y_(n+1)). The mismatch is that the prediction has the path from pixel 1106 to F_(j)(x_(m),y_(n)) but the update has the path from F_(j)(x_(m+1),y_(n+1)) to pixel 1104

The barbell lifting process can solve this problem. In the update stage the high-pass coefficients are distributed to those pixels that are used to calculate the high-pass coefficients in the prediction stage. Combining equations (2) and (8), the high-pass coefficient is obtained as follows:

$\begin{matrix} {{h_{j}\left( {x,y} \right)} = {{F_{j}\left( {x,y} \right)} + {\sum\limits_{i}{\sum\limits_{m}{\sum\limits_{n}{a_{i}{\alpha_{i,j}\left( {x,y,m,n} \right)}{F_{i}\left( {{x + {\Delta\; x_{m}}},{y + {\Delta\; y_{n}}}} \right)}}}}}}} & (10) \end{matrix}$ The value α_(i,j)(x,y,m,n) is the barbell parameter specified by the coordination x, y, m, n. The low-pass coefficient is calculated as follows:

$\begin{matrix} {{l_{i}\left( {x,y} \right)} = {{F_{i}\left( {x,y} \right)} + {\sum\limits_{j}{\sum\limits_{m}{\sum\limits_{n}{b_{j}{\alpha_{i,j}\left( {x,y,m,n} \right)}{h_{j}\left( {{x + {\Delta\; x_{m}}},{y + {\Delta\; y_{n}}}} \right)}}}}}}} & (11) \end{matrix}$

This means that the high-pass coefficient will be added exactly to the pixels they predict. For the above example, the predicted weight from pixel 1106 to F_(j)(x_(m),n_(y)) is non-zero. Therefore, the update weight from F_(j)(x_(m),y_(n)) to pixel 1106, which equals the predict weight, is also non-zero. This process eliminates mismatch between the prediction stage and the update stage. The barbell lifting process corresponding to the equations (10) and (11) is depicted in FIG. 12.

FIG. 12 illustrates a sequence of 1-D pixel arrays 1200 that are barbell lifted to high-pass coefficient arrays 1202 and low-pass coefficient arrays 1204. Using equation (10) to obtain the high-pass coefficients and equation (11) to obtain the low-pass coefficients, the prediction and update stages are consistent. The new update stage avoids the need to derive inverse motion vectors. Therefore, the proposed technique preserves the operations, while avoiding ambiguity in the update stage.

Exemplary Operations

Described herein are exemplary methods for barbell lifting for video coding. The methods described herein may be embodied as logic instructions on one or more computer-readable medium. When executed on a processor, the logic instructions cause a general purpose computing device to be programmed as a special-purpose machine that implements the described methods. In the following exemplary operations, the components and connections depicted in the figures may be used to implement lifting for video coding.

FIG. 13 illustrates an exemplary enhanced wavelet lifting algorithm 1300 for coding video data using barbell lifting. A video coder, such as the video coder shown in FIG. 2, can execute the operations shown in the algorithm 1300. It is assumed that a sequence of video frames is input to the video coder.

An estimating operation 1302 estimates barbell lifting parameters. In one implementation, when the barbell lifting function is used for motion alignment, the estimating operation 1302 estimates the motion data (e.g., motion vectors, coding modes and interpolation). In this implementation, the motion data are estimated in either of frame, group of macroblocks, macroblock and block.

In another implementation of the estimating operation 1302, when the barbell lifting function is used for spatial prediction, the prediction data (prediction directions, coding modes and interpolation) are estimated. In this implementation, the prediction data are estimated in either of frame, group of macroblocks, macroblock and block.

The estimated parameters generated by the estimating operation 1302 are used in the barbell lifting functions of the barbell lifting process to decompose the input video signal into low-pass and high-pass coefficients. The barbell lifting process includes two stages: a prediction stage, and an update stage. The prediction stage is embodied in a first generating operation 1304, and the update stage is embodied in another generating operation 1306.

The first generating operation 1304 generates high-pass wavelet coefficients based on a function of pixels in the previous adjacent frame and a function of pixels in a subsequent adjacent frame. High-pass coefficients are generated for every other frame in a frame sequence. Typically, high-pass coefficients are generated for the odd frames in the sequence. The functions of the pixels in adjacent frames may be linear, or non-linear. Exemplary functions are shown and described above. A discrete wavelet transform is applied iteratively for each pixel in the frame, including the barbell functions, to generate the high-pass frame.

The second generating operation 1306 generates low-pass wavelet coefficients based on a function of high-pass coefficients in one or more adjacent frames. The low-pass coefficients are generated for the frames for which high-pass coefficients were not generated. Typically, low-pass coefficients are generated for the even frames in the sequence. The function of high-pass coefficients may be linear or non-linear. Exemplary barbell functions are shown and described above. A discrete wavelet transform is performed over the functions of high-pass coefficients and each pixel in the frame to generate a frame of low-pass coefficients.

The estimated parameters and the decomposed coefficients are input to an entropy coding operation 1308. The entropy coding operation 1308 applies an entropy coding algorithm, such as Fibonacci coding, Golomb coding, Rice coding, Huffman coding, or Range coding. The algorithm performed by the entropy coding operation 1308 compresses the data even more, by assigning the most common data symbols to the shortest codes.

FIG. 14 illustrates an exemplary decoding algorithm 1400 for decoding coded video data that is coded using barbell lifting. Typically, the decoding algorithm 1400 is performed by a decoder executing as part of a video receiver. It is assumed that the input to the decoding algorithm 1400 is a signal containing frames that have been encoded using barbell lifting as described above.

An entropy decoding operation 1402 entropy decodes the received barbell lifting coded frames. The entropy decoding operation 1402 performs substantially the inverse of operation 1308 (FIG. 3). The output of the entropy decoding operation 1402 is a sequence of alternating low-pass and high-pass frames.

A generating operation 1404 generates even frames of video data using inverse barbell lifting. Each pixel in the even frames is generated by performing an inverse wavelet transform on a combination of high-pass coefficients in one or more adjacent frames and a corresponding low-pass coefficient. A barbell function that was used in the coding process is applied to the high-pass coefficients and input to the inverse wavelet transform. The even frames of video data are generated by performing the generating operation 1404 for all pixels in the even frames.

Another generating operation 1406 then generates the remaining frames of video data using inverse barbell lifting. Each pixel in an odd frame is generated by performing an inverse wavelet transform on a combination of pixels in adjacent video frames and a corresponding high-pass coefficient. A barbell function that was used in the coding process is applied to the pixels in the adjacent video frame and input to the inverse wavelet transform. The odd frames of video data are generated by performing the generating operation 1406 for all pixels in the odd frames.

A reconstructing operation 1408 reconstructs the original video using the even and odd decoded video frames. The reconstructing operation 1408 puts the decoded video frames in order and prepares them for storage or presentation.

Exemplary Computing Device

With reference to FIG. 15, an exemplary system for implementing the operations described herein includes a general-purpose computing device in the form of a conventional personal computer 20, including a processing unit 21, a system memory 22, and a system bus 23. System bus 23 links together various system components including system memory 22 and processing unit 21. System bus 23 may be any of several types of bus structures including a memory bus or memory controller, a peripheral bus, and a local bus using any of a variety of bus architectures. System memory 22 includes read only memory (ROM) 24 and random access memory (RAM) 25. A basic input/output system 26 (BIOS), containing the basic routine that helps to transfer information between elements within the personal computer 20, such as during start-up, is stored in ROM 24.

As depicted, in this example personal computer 20 further includes a hard disk drive 27 for reading from and writing to a hard disk (not shown), a magnetic disk drive 28 for reading from or writing to a removable magnetic disk 29, and an optical disk drive 30 for reading from or writing to a removable optical disk 31 such as a CD ROM, DVD, or other like optical media. Hard disk drive 27, magnetic disk drive 28, and optical disk drive 30 are connected to the system bus 23 by a hard disk drive interface 32, a magnetic disk drive interface 33, and an optical drive interface 34, respectively. These exemplary drives and their associated computer-readable media provide nonvolatile storage of computer readable instructions, data structures, computer programs and other data for the personal computer 20.

Although the exemplary environment described herein employs a hard disk, a removable magnetic disk 29 and a removable optical disk 31, it should be appreciated by those skilled in the art that other types of computer readable media which can store data that is accessible by a computer, such as magnetic cassettes, flash memory cards, digital video disks, random access memories (RAMs), read only memories (ROMs), and the like, may also be used in the exemplary operating environment.

A number of computer programs may be stored on the hard disk, magnetic disk 29, optical disk 31, ROM 24 or RAM 25, including an operating system 35, one or more application programs 36, other programs 37, and program data 38. A user may enter commands and information into the personal computer 20 through input devices such as a keyboard 40 and pointing device 42 (such as a mouse).

Of particular significance to the present invention, a camera 55 (such as a digital/electronic still or video camera, or film/photographic scanner) capable of capturing a sequence of images 56 can also be included as an input device to the personal computer 20. The images 56 are input into the computer 20 via an appropriate camera interface 57. In this example, interface 57 is connected to the system bus 23, thereby allowing the images to be routed to and stored in the RAM 25, or one of the other data storage devices associated with the computer 20. It is noted, however, that image data can be input into the computer 20 from any of the aforementioned computer-readable media as well, without requiring the use of the camera 55.

Other input devices (not shown) may include a microphone, joystick, game pad, satellite dish, scanner, or the like. These and other input devices are often connected to the processing unit 21 through a serial port interface 46 that is coupled to the system bus, but may be connected by other interfaces, such as a parallel port, game port, a universal serial bus (USB), etc.

A monitor 47 or other type of display device is also connected to the system bus 23 via an interface, such as a video adapter 48. In addition to the monitor, personal computers typically include other peripheral output devices (not shown), such as speakers and printers.

Personal computer 20 may operate in a networked environment using logical connections to one or more remote computers, such as a remote computer 49. Remote computer 49 may be another personal computer, a server, a router, a network PC, a peer device or other common network node, and typically includes many or all of the elements described above relative to the personal computer 20.

The logical connections depicted in FIG. 15 include a local area network (LAN) 51 and a wide area network (WAN) 52. Such networking environments are commonplace in offices, enterprise-wide computer networks, Intranets and the Internet.

When used in a LAN networking environment, personal computer 20 is connected to local network 51 through a network interface or adapter 53. When used in a WAN networking environment, the personal computer 20 typically includes a modem 54 or other means for establishing communications over the wide area network 52, such as the Internet. Modem 54, which may be internal or external, is connected to system bus 23 via the serial port interface 46.

In a networked environment, computer programs depicted relative to personal computer 20, or portions thereof, may be stored in a remote memory storage device. It will be appreciated that the network connections shown are exemplary and other means of establishing a communications link between the computers may be used.

Various modules and techniques may be described herein in the general context of computer-executable instructions, such as program modules, executed by one or more computers or other devices. Generally, program modules include routines, programs, objects, components, data structures, etc. that perform particular tasks or implement particular abstract data types. Typically, the functionality of the program modules may be combined or distributed as desired in various embodiments.

An implementation of these modules and techniques may be stored on or transmitted across some form of computer-readable media. Computer-readable media can be any available media that can be accessed by a computer. By way of example, and not limitation, computer-readable media may comprise “computer storage media” and “communications media.”

“Computer storage media” includes volatile and non-volatile, removable and non-removable media implemented in any method or technology for storage of information such as computer-readable instructions, data structures, program modules, or other data. Computer storage media includes, but is not limited to, RAM, ROM, EEPROM, flash memory or other memory technology, CD-ROM, digital versatile disks (DVD) or other optical storage, magnetic cassettes, magnetic tape, magnetic disk storage or other magnetic storage devices, or any other medium which can be used to store the desired information and which can be accessed by a computer.

“Communication media” typically embodies computer-readable instructions, data structures, program modules, or other data in a modulated data signal, such as carrier wave or other transport mechanism. Communication media also includes any information delivery media. The term “modulated data signal” means a signal that has one or more of its characteristics set or changed in such a manner as to encode information in the signal. By way of example, and not limitation, communication media includes wired media such as a wired network or direct-wired connection, and wireless media such as acoustic, RF, infrared, and other wireless media. Combinations of any of the above are also included within the scope of computer-readable media.

Although the exemplary operating embodiment is described in terms of operational flows in a conventional computer, one skilled in the art will realize that the present invention can be embodied in any platform or environment that processes and/or communicates video signals. Examples include both programmable and non-programmable devices such as hardware having a dedicated purpose such as video conferencing, firmware, semiconductor devices, hand-held computers, palm-sized computers, cellular telephones, and the like.

Although some exemplary methods and systems have been illustrated in the accompanying drawings and described in the foregoing Detailed Description, it will be understood that the methods and systems shown and described are not limited to the particular implementation described herein, but rather are capable of numerous rearrangements, modifications and substitutions without departing from the spirit set forth herein. 

1. A method comprising: receiving barbell coded video data including at least one even-numbered frame of low-pass coefficients and at least one odd-numbered frame of high-pass coefficients; generating an even-numbered frame of decoded video data using inverse barbell lifting by generating a plurality of decoded pixels in the decoded even-number frame based at least in part on a sum of a low-pass coefficient in the even-numbered frame and a result of multiplication of a high-pass coefficient in an adjacent frame with a filtering parameter; and generating an odd-numbered frame of video data using inverse barbell lifting.
 2. The method as recited in claim 1, wherein the generating an even-numbered frame of decoded video data comprises performing an inverse wavelet transform on a low-pass coefficient in the even-numbered frame and a combination of one or more high-pass coefficients in an adjacent frame.
 3. The method as recited in claim 1, wherein the generating an odd-numbered frame of video data comprises performing an inverse wavelet transform on a high-pass coefficient in the odd-numbered frame and a combination of one or more decoded pixels in an adjacent video frame.
 4. The method as recited in claim 1, further comprising entropy decoding the barbell coded video data.
 5. The method as recited in claim 1, further comprising reconstructing decoded video data from the even-numbered frame of decoded video data and the odd-numbered frame of video data.
 6. The method as recited in claim 1, wherein the generating an even-numbered frame of decoded video includes adaptively applying an inverse barbell function to pixel blocks of different sizes within the even-numbered frame.
 7. The method as recited in claim 1, further comprising multiplying the filtering parameter by a constant, wherein the constant is negative two.
 8. A method comprising: receiving barbell coded video data including at least one even-numbered frame of low-pass coefficients and at least one odd-numbered frame of high-pass coefficients; generating an even-numbered frame of decoded video data using inverse barbell lifting applying a function of the form: x ₀ =l ₀+(−2b)×ĥ₀, wherein x₀ represents a decoded pixel in the even-numbered frame, l₀ represents a low-pass coefficient in the even-numbered frame, ĥ₀ represents a high-pass coefficient in an adjacent frame, and b represents a filtering parameter; and generating an odd-numbered frame of video data using inverse barbell lifting.
 9. At least one computer readable storage device storing computer-executable instructions that when executed by at least one processor cause the at least one processor to perform acts comprising: receiving barbell coded video data including at least one even-numbered frame of low-pass coefficients and at least one odd-numbered frame of high-pass coefficients; generating an even-numbered frame of decoded video data using inverse barbell lifting by generating a plurality of decoded pixels in the decoded even-number frame based at least in part on a sum of a low-pass coefficient in the even-numbered frame and a result of multiplication of a high-pass coefficient in an adjacent frame with a filtering parameter; and generating an odd-numbered frame of video data using inverse barbell lifting.
 10. The at least one computer readable storage device of claim 9, wherein the generating an even-numbered frame of decoded video data comprises performing an inverse wavelet transform on a low-pass coefficient in the even-numbered frame and a combination of one or more high-pass coefficients in an adjacent frame.
 11. The at least one computer readable storage device of claim 9, wherein the generating an odd-numbered frame of video data comprises performing an inverse wavelet transform on a high-pass coefficient in the odd-numbered frame and a combination of one or more decoded pixels in an adjacent video frame.
 12. The at least one computer readable storage device of claim 9, wherein the acts further comprising entropy decoding the barbell coded video data.
 13. The at least one computer readable storage device of claim 9, wherein the acts further comprise reconstructing decoded video data from the even-numbered frame of decoded video data and the odd-numbered frame of video data.
 14. The at least one computer readable storage device of claim 9, wherein the generating an even-numbered frame of decoded video includes adaptively applying an inverse barbell function to pixel blocks of different sizes within the even-numbered frame.
 15. The at least one computer readable storage device of claim 9, the acts further comprising multiplying the filtering parameter by a constant, wherein the constant is negative two. 